2650 lines
24 KiB
Plaintext
2650 lines
24 KiB
Plaintext
KeyCode=abcdefghijklmnopqrstuvwxyzABCDEFGHIJKLMNOPQRSTUVWXYZ1234567890\_[]{}
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Prompt=
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ConstructPhrase=
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Length=20
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[Data]
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\ \
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\\ \
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\eq =
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\eq ∼
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\eq ∽
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\eq ≈
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\eq ≋
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\eq ∻
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\eq ∾
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\eq ∿
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\eq ≀
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\eq ≃
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\eq ⋍
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\eq ≂
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\eq ≅
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\eq ≌
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\eq ≊
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\eq ≡
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\eq ≣
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\eq ≐
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\eq ≑
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\eq ≒
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\eq ≓
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\eq ≔
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\eq ≕
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\eq ≖
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\eq ≗
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\eq ≘
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\eq ≙
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\eq ≚
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\eq ≛
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\eq ≜
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\eq ≝
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\eq ≞
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\eq ≟
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\eq ≍
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\eq ≎
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\eq ≬
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\eq ⋕
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\eq =
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\eqn ≠
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\eqn ≁
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\eqn ≉
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\eqn ≇
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\eqn ≆
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\eqn ≢
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\eqn ≭
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\=n ≠
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\~ ∼
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\~ ~
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\~n ≁
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\-~ ≂
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\~~- ≊
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\.= ≐
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\.=. ≑
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\(= ≘
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\and= ≙
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\*= ≛
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\leq <
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\geq ⋑
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\geq ⊒
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\geq ⊱
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\geq ⊵
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\geq ⋗
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\geq ⋛
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\geq ⋝
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\geq >
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\geqn ⋩
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\geqn ⊅
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\geqn ⊉
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\geqn ⋣
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\geqn ⋥
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\geqn ⋫
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\geqn ⋡
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\<= ≤
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\>= ≥
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\<=n ≰
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\>=n ≱
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\len ≰
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\gen ≱
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\<n ≮
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\>n ≯
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\<~ ≲
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\>~ ≳
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\<~n ⋦
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\>~n ⋧
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\<~nn ≴
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\>~nn ≵
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\sub ⊂
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\sup ⊃
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\subn ⊄
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\supn ⊅
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\sub= ⊆
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\sup= ⊇
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\sub=n ⊈
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\sup=n ⊉
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\squb ⊏
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\squp ⊐
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\squb= ⊑
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\squp= ⊒
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\squb=n ⋢
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\squp=n ⋣
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\member ∈
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\member ∉
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\member ∊
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\member ∋
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\member ∌
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\member ∍
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\member ⋲
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\member ⋳
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||
\member ⋴
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||
\member ⋵
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||
\member ⋶
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||
\member ⋷
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||
\member ⋸
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||
\member ⋹
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\member ⋺
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\member ⋻
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\member ⋼
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\member ⋽
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\member ⋾
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\member ⋿
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\inn ∉
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||
\nin ∌
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\intersection ∩
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||
\intersection ⋂
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\intersection ∧
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||
\intersection ⋀
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\intersection ⋏
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\intersection ⨇
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\intersection ⊓
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\intersection ⨅
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\intersection ⋒
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||
\intersection ∏
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\intersection ⊼
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||
\intersection ⨉
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\union ∪
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||
\union ⋃
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\union ∨
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\union ⋁
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\union ⋎
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\union ⨈
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\union ⊔
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\union ⨆
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\union ⋓
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\union ∐
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\union ⨿
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\union ⊽
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\union ⊻
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\union ⊍
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\union ⨃
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\union ⊎
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\union ⨄
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\union ⊌
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\union ∑
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\union ⅀
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\and ∧
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\or ∨
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\And ⋀
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\Or ⋁
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\i ∩
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\un ∪
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\u+ ⊎
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\u. ⊍
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||
\I ⋂
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||
\Un ⋃
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||
\U+ ⨄
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||
\U. ⨃
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||
\glb ⊓
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||
\lub ⊔
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||
\Glb ⨅
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||
\Lub ⨆
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||
\entails ⊢
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||
\entails ⊣
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||
\entails ⊤
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\entails ⊥
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||
\entails ⊦
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\entails ⊧
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\entails ⊨
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\entails ⊩
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\entails ⊪
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\entails ⊫
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\entails ⊬
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\entails ⊭
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\entails ⊮
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\entails ⊯
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\|- ⊢
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\|-n ⊬
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\-| ⊣
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\|= ⊨
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\|=n ⊭
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\||- ⊩
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\||-n ⊮
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\||= ⊫
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\||=n ⊯
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\|||- ⊪
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\| ∣
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\|n ∤
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\|| ∥
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\||n ∦
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\all ∀
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\ex ∃
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\exn ∄
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\0 ∅
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\C ∁
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\uin ⟒
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\din ⫙
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\c ⌜
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\c ⌝
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\c ⌞
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\c ⌟
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\c ⌈
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\c ⌉
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\c ⌊
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\c ⌋
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\cu ⌜
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\cu ⌝
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\cu ⌈
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\cu ⌉
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\cl ⌞
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\cl ⌟
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\cl ⌊
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\cl ⌋
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\cul ⌜
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\cuL ⌈
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\cur ⌝
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\cuR ⌉
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\cll ⌞
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\clL ⌊
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\clr ⌟
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\clR ⌋
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\qed ∎
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\x ×
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\o ∘
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\comp ∘
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\. ∙
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\. .
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\* ⋆
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\.+ ∔
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\.- ∸
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\: ∶
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\: ⦂
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\: ː
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\: ꞉
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\: ˸
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\: ፥
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\: ፦
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\: :
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\: ﹕
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\: ︓
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\, ʻ
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\, ،
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\, ⸲
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\, ⸴
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\, ⹁
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\, ⹉
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\, 、
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\, ︐
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\, ︑
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\, ﹐
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\, ﹑
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\, ,
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\, 、
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\; ⨾
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\; ⨟
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\; ⁏
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\; ፤
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\; ꛶
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\; ;
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\; ︔
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\; ﹔
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\; ⍮
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\; ⸵
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\; ;
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\:: ∷
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\::- ∺
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\-: ∹
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\+ ⊹
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\+ +
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\sqrt √
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\surd3 ∛
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\surd4 ∜
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\increment ∆
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\inf ∞
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\& ⅋
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\& ﹠
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\& &
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\z; ⨟
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\z; ⨾
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\z: ⦂
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\at @
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\at @
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\o-- ⊖
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\ox ⊗
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\o/ ⊘
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\o. ⊙
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\oo ⊚
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\o* ⊛
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\o= ⊜
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\o- ⊝
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\O+ ⨁
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\Ox ⨂
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\O. ⨀
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\O* ⍟
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\b. ⊡
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\b/ ⧄
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\b\ ⧅
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\b* ⧆
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\bo ⧇
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\bsq ⧈
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\box? ⍰
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\box' ⍞
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\integral ∮
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\angle ∟
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\angle ⊾
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\angle ⊿
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\esh ʃ
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||
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||
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||
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||
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\l ⟽
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||
\l ⤆
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\l ↶
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\l ↺
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\l ⟲
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\r →
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\r ⇒
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
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||
\r ⟴
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||
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||
\r ➵
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||
\r ➸
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||
\r ➙
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||
\r ➔
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||
\r ➛
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||
\r ➜
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||
\r ➝
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||
\r ➞
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||
\r ➟
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||
\r ➠
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||
\r ➡
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||
\r ➢
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||
\r ➣
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||
\r ➤
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||
\r ➧
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||
\r ➨
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||
\r ➩
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||
\r ➪
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||
\r ➫
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||
\r ➬
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||
\r ➭
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||
\r ➮
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||
\r ➯
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||
\r ➱
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||
\r ➲
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||
\r ➳
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||
\r ➺
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||
\r ➻
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||
\r ➼
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||
\r ➽
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||
\r ➾
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||
\r ⊸
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||
\u ↑
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||
\u ⇑
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||
\u ⤊
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||
\u ⟰
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||
\u ⇈
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||
\u ⇅
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||
\u ↥
|
||
\u ⇧
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||
\u ↟
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||
\u ↿
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||
\u ↾
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||
\u ⇡
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||
\u ⇞
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||
\u ↰
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||
\u ↱
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||
\u ➦
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||
\u ⇪
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||
\u ⇫
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||
\u ⇬
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||
\u ⇭
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||
\u ⇮
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||
\u ⇯
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||
\d ↓
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||
\d ⇓
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||
\d ⤋
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||
\d ⟱
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||
\d ⇊
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||
\d ⇵
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||
\d ↧
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||
\d ⇩
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||
\d ↡
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||
\d ⇃
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||
\d ⇂
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||
\d ⇣
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||
\d ⇟
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||
\d ↵
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||
\d ↲
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||
\d ↳
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||
\d ➥
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||
\d ↯
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||
\ud ↕
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||
\ud ⇕
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||
\ud ↨
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||
\ud ⇳
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||
\lr ↔
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||
\lr ⇔
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||
\lr ⇼
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||
\lr ↭
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||
\lr ⇿
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||
\lr ⟷
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||
\lr ⟺
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||
\lr ↮
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||
\lr ⇎
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||
\lr ⇹
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||
\ul ↖
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||
\ul ⇖
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||
\ul ⇱
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||
\ul ↸
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||
\ur ↗
|
||
\ur ⇗
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||
\ur ➶
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||
\ur ➹
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||
\ur ➚
|
||
\dr ↘
|
||
\dr ⇘
|
||
\dr ⇲
|
||
\dr ➴
|
||
\dr ➷
|
||
\dr ➘
|
||
\dl ↙
|
||
\dl ⇙
|
||
\l- ←
|
||
\<- ←
|
||
\l= ⇐
|
||
\<= ⇐
|
||
\r- →
|
||
\-> →
|
||
\r= ⇒
|
||
\=> ⇒
|
||
\u- ↑
|
||
\u= ⇑
|
||
\d- ↓
|
||
\d= ⇓
|
||
\ud- ↕
|
||
\ud= ⇕
|
||
\lr- ↔
|
||
\<-> ↔
|
||
\lr= ⇔
|
||
\<=> ⇔
|
||
\ul- ↖
|
||
\ul= ⇖
|
||
\ur- ↗
|
||
\ur= ⇗
|
||
\dr- ↘
|
||
\dr= ⇘
|
||
\dl- ↙
|
||
\dl= ⇙
|
||
\l== ⇚
|
||
\l-2 ⇇
|
||
\l-r- ⇆
|
||
\r== ⇛
|
||
\r-2 ⇉
|
||
\r-3 ⇶
|
||
\r-l- ⇄
|
||
\u== ⟰
|
||
\u-2 ⇈
|
||
\u-d- ⇅
|
||
\d== ⟱
|
||
\d-2 ⇊
|
||
\d-u- ⇵
|
||
\l-- ⟵
|
||
\<-- ⟵
|
||
\l~ ↜
|
||
\l~ ⇜
|
||
\r-- ⟶
|
||
\--> ⟶
|
||
\r~ ↝
|
||
\r~ ⇝
|
||
\r~ ⟿
|
||
\lr-- ⟷
|
||
\<--> ⟷
|
||
\lr~ ↭
|
||
\l-n ↚
|
||
\<-n ↚
|
||
\l=n ⇍
|
||
\r-n ↛
|
||
\->n ↛
|
||
\r=n ⇏
|
||
\=>n ⇏
|
||
\lr-n ↮
|
||
\<->n ↮
|
||
\lr=n ⇎
|
||
\<=>n ⇎
|
||
\l-| ↤
|
||
\ll- ↞
|
||
\r-| ↦
|
||
\rr- ↠
|
||
\u-| ↥
|
||
\uu- ↟
|
||
\d-| ↧
|
||
\dd- ↡
|
||
\ud-| ↨
|
||
\l-> ↢
|
||
\r-> ↣
|
||
\r-o ⊸
|
||
\-o ⊸
|
||
\dz ↯
|
||
\... ⋯
|
||
\... ⋮
|
||
\... ⋰
|
||
\... ⋱
|
||
\--- ─
|
||
\--- │
|
||
\--- ┌
|
||
\--- ┐
|
||
\--- └
|
||
\--- ┘
|
||
\--- ├
|
||
\--- ┤
|
||
\--- ┬
|
||
\--- ┼
|
||
\--- ┴
|
||
\--- ╴
|
||
\--- ╵
|
||
\--- ╶
|
||
\--- ╷
|
||
\--- ╭
|
||
\--- ╮
|
||
\--- ╯
|
||
\--- ╰
|
||
\--- ╱
|
||
\--- ╲
|
||
\--- ╳
|
||
\--= ═
|
||
\--= ║
|
||
\--= ╔
|
||
\--= ╗
|
||
\--= ╚
|
||
\--= ╝
|
||
\--= ╠
|
||
\--= ╣
|
||
\--= ╦
|
||
\--= ╬
|
||
\--= ╩
|
||
\--= ╒
|
||
\--= ╕
|
||
\--= ╘
|
||
\--= ╛
|
||
\--= ╞
|
||
\--= ╡
|
||
\--= ╤
|
||
\--= ╪
|
||
\--= ╧
|
||
\--= ╓
|
||
\--= ╖
|
||
\--= ╙
|
||
\--= ╜
|
||
\--= ╟
|
||
\--= ╢
|
||
\--= ╥
|
||
\--= ╫
|
||
\--= ╨
|
||
\--_ ━
|
||
\--_ ┃
|
||
\--_ ┏
|
||
\--_ ┓
|
||
\--_ ┗
|
||
\--_ ┛
|
||
\--_ ┣
|
||
\--_ ┫
|
||
\--_ ┳
|
||
\--_ ╋
|
||
\--_ ┻
|
||
\--_ ╸
|
||
\--_ ╹
|
||
\--_ ╺
|
||
\--_ ╻
|
||
\--_ ┍
|
||
\--_ ┯
|
||
\--_ ┑
|
||
\--_ ┕
|
||
\--_ ┷
|
||
\--_ ┙
|
||
\--_ ┝
|
||
\--_ ┿
|
||
\--_ ┥
|
||
\--_ ┎
|
||
\--_ ┰
|
||
\--_ ┒
|
||
\--_ ┖
|
||
\--_ ┸
|
||
\--_ ┚
|
||
\--_ ┠
|
||
\--_ ╂
|
||
\--_ ┨
|
||
\--_ ┞
|
||
\--_ ╀
|
||
\--_ ┦
|
||
\--_ ┟
|
||
\--_ ╁
|
||
\--_ ┧
|
||
\--_ ┢
|
||
\--_ ╈
|
||
\--_ ┪
|
||
\--_ ┡
|
||
\--_ ╇
|
||
\--_ ┩
|
||
\--_ ┮
|
||
\--_ ┭
|
||
\--_ ┶
|
||
\--_ ┵
|
||
\--_ ┾
|
||
\--_ ┽
|
||
\--_ ┲
|
||
\--_ ┱
|
||
\--_ ┺
|
||
\--_ ┹
|
||
\--_ ╊
|
||
\--_ ╉
|
||
\--_ ╆
|
||
\--_ ╅
|
||
\--_ ╄
|
||
\--_ ╃
|
||
\--_ ╿
|
||
\--_ ╽
|
||
\--_ ╼
|
||
\--_ ╾
|
||
\--. ╌
|
||
\--. ╎
|
||
\--. ┄
|
||
\--. ┆
|
||
\--. ┈
|
||
\--. ┊
|
||
\--. ╍
|
||
\--. ╏
|
||
\--. ┅
|
||
\--. ┇
|
||
\--. ┉
|
||
\--. ┋
|
||
\t ◂
|
||
\t ◃
|
||
\t ◄
|
||
\t ◅
|
||
\t ▸
|
||
\t ▹
|
||
\t ►
|
||
\t ▻
|
||
\t ▴
|
||
\t ▵
|
||
\t ▾
|
||
\t ▿
|
||
\t ◢
|
||
\t ◿
|
||
\t ◣
|
||
\t ◺
|
||
\t ◤
|
||
\t ◸
|
||
\t ◥
|
||
\t ◹
|
||
\T ◀
|
||
\T ◁
|
||
\T ▶
|
||
\T ▷
|
||
\T ▲
|
||
\T △
|
||
\T ▼
|
||
\T ▽
|
||
\T ◬
|
||
\T ◭
|
||
\T ◮
|
||
\tb ◂
|
||
\tb ▸
|
||
\tb ▴
|
||
\tb ▾
|
||
\tb ◄
|
||
\tb ►
|
||
\tb ◢
|
||
\tb ◣
|
||
\tb ◤
|
||
\tb ◥
|
||
\tw ◃
|
||
\tw ▹
|
||
\tw ▵
|
||
\tw ▿
|
||
\tw ◅
|
||
\tw ▻
|
||
\tw ◿
|
||
\tw ◺
|
||
\tw ◸
|
||
\tw ◹
|
||
\Tb ◀
|
||
\Tb ▶
|
||
\Tb ▲
|
||
\Tb ▼
|
||
\Tw ◁
|
||
\Tw ▷
|
||
\Tw △
|
||
\Tw ▽
|
||
\sq ■
|
||
\sq □
|
||
\sq ◼
|
||
\sq ◻
|
||
\sq ◾
|
||
\sq ◽
|
||
\sq ▣
|
||
\sq ▢
|
||
\sq ▤
|
||
\sq ▥
|
||
\sq ▦
|
||
\sq ▧
|
||
\sq ▨
|
||
\sq ▩
|
||
\sq ◧
|
||
\sq ◨
|
||
\sq ◩
|
||
\sq ◪
|
||
\sq ◫
|
||
\sq ◰
|
||
\sq ◱
|
||
\sq ◲
|
||
\sq ◳
|
||
\sqb ■
|
||
\sqb ◼
|
||
\sqb ◾
|
||
\sqw □
|
||
\sqw ◻
|
||
\sqw ◽
|
||
\sq. ▣
|
||
\sqo ▢
|
||
\re ▬
|
||
\re ▭
|
||
\re ▮
|
||
\re ▯
|
||
\reb ▬
|
||
\reb ▮
|
||
\rew ▭
|
||
\rew ▯
|
||
\pa ▰
|
||
\pa ▱
|
||
\pab ▰
|
||
\paw ▱
|
||
\di ◆
|
||
\di ◇
|
||
\di ◈
|
||
\dib ◆
|
||
\diw ◇
|
||
\di. ◈
|
||
\ci ●
|
||
\ci ○
|
||
\ci ◎
|
||
\ci ◌
|
||
\ci ◯
|
||
\ci ◍
|
||
\ci ◐
|
||
\ci ◑
|
||
\ci ◒
|
||
\ci ◓
|
||
\ci ◔
|
||
\ci ◕
|
||
\ci ◖
|
||
\ci ◗
|
||
\ci ◠
|
||
\ci ◡
|
||
\ci ◴
|
||
\ci ◵
|
||
\ci ◶
|
||
\ci ◷
|
||
\ci ⚆
|
||
\ci ⚇
|
||
\ci ⚈
|
||
\ci ⚉
|
||
\cib ●
|
||
\ciw ○
|
||
\ci. ◎
|
||
\ci.. ◌
|
||
\ciO ◯
|
||
\st ⋆
|
||
\st ✦
|
||
\st ✧
|
||
\st ✶
|
||
\st ✴
|
||
\st ✹
|
||
\st ★
|
||
\st ☆
|
||
\st ✪
|
||
\st ✫
|
||
\st ✯
|
||
\st ✰
|
||
\st ✵
|
||
\st ✷
|
||
\st ✸
|
||
\st4 ✦
|
||
\st4 ✧
|
||
\st6 ✶
|
||
\st8 ✴
|
||
\st12 ✹
|
||
\bA 𝔸
|
||
\bB 𝔹
|
||
\bC ℂ
|
||
\bD 𝔻
|
||
\bE 𝔼
|
||
\bF 𝔽
|
||
\bG 𝔾
|
||
\bH ℍ
|
||
\bI 𝕀
|
||
\bJ 𝕁
|
||
\bK 𝕂
|
||
\bL 𝕃
|
||
\bM 𝕄
|
||
\bN ℕ
|
||
\bO 𝕆
|
||
\bP ℙ
|
||
\bQ ℚ
|
||
\bR ℝ
|
||
\bS 𝕊
|
||
\bT 𝕋
|
||
\bU 𝕌
|
||
\bV 𝕍
|
||
\bW 𝕎
|
||
\bX 𝕏
|
||
\bY 𝕐
|
||
\bZ ℤ
|
||
\bGG ℾ
|
||
\bGP ℿ
|
||
\bGS ⅀
|
||
\ba 𝕒
|
||
\bb 𝕓
|
||
\bc 𝕔
|
||
\bd 𝕕
|
||
\be 𝕖
|
||
\bf 𝕗
|
||
\bg 𝕘
|
||
\bh 𝕙
|
||
\bi 𝕚
|
||
\bj 𝕛
|
||
\bk 𝕜
|
||
\bl 𝕝
|
||
\bm 𝕞
|
||
\bn 𝕟
|
||
\bo 𝕠
|
||
\bp 𝕡
|
||
\bq 𝕢
|
||
\br 𝕣
|
||
\bs 𝕤
|
||
\bt 𝕥
|
||
\bu 𝕦
|
||
\bv 𝕧
|
||
\bw 𝕨
|
||
\bx 𝕩
|
||
\by 𝕪
|
||
\bz 𝕫
|
||
\bGg ℽ
|
||
\bGp ℼ
|
||
\b0 𝟘
|
||
\b1 𝟙
|
||
\b2 𝟚
|
||
\b3 𝟛
|
||
\b4 𝟜
|
||
\b5 𝟝
|
||
\b6 𝟞
|
||
\b7 𝟟
|
||
\b8 𝟠
|
||
\b9 𝟡
|
||
\BA 𝐀
|
||
\BB 𝐁
|
||
\BC 𝐂
|
||
\BD 𝐃
|
||
\BE 𝐄
|
||
\BF 𝐅
|
||
\BG 𝐆
|
||
\BH 𝐇
|
||
\BI 𝐈
|
||
\BJ 𝐉
|
||
\BK 𝐊
|
||
\BL 𝐋
|
||
\BM 𝐌
|
||
\BN 𝐍
|
||
\BO 𝐎
|
||
\BP 𝐏
|
||
\BQ 𝐐
|
||
\BR 𝐑
|
||
\BS 𝐒
|
||
\BT 𝐓
|
||
\BU 𝐔
|
||
\BV 𝐕
|
||
\BW 𝐖
|
||
\BX 𝐗
|
||
\BY 𝐘
|
||
\BZ 𝐙
|
||
\Ba 𝐚
|
||
\Bb 𝐛
|
||
\Bc 𝐜
|
||
\Bd 𝐝
|
||
\Be 𝐞
|
||
\Bf 𝐟
|
||
\Bg 𝐠
|
||
\Bh 𝐡
|
||
\Bi 𝐢
|
||
\Bj 𝐣
|
||
\Bk 𝐤
|
||
\Bl 𝐥
|
||
\Bm 𝐦
|
||
\Bn 𝐧
|
||
\Bo 𝐨
|
||
\Bp 𝐩
|
||
\Bq 𝐪
|
||
\Br 𝐫
|
||
\Bs 𝐬
|
||
\Bt 𝐭
|
||
\Bu 𝐮
|
||
\Bv 𝐯
|
||
\Bw 𝐰
|
||
\Bx 𝐱
|
||
\By 𝐲
|
||
\Bz 𝐳
|
||
\BGA 𝚨
|
||
\BGB 𝚩
|
||
\BGC 𝚾
|
||
\BGD 𝚫
|
||
\BGE 𝚬
|
||
\BGG 𝚪
|
||
\BGH 𝚮
|
||
\BGI 𝚰
|
||
\BGK 𝚱
|
||
\BGL 𝚲
|
||
\BGM 𝚳
|
||
\BGN 𝚴
|
||
\BGO 𝛀
|
||
\BOmicron 𝚶
|
||
\BGF 𝚽
|
||
\BPi 𝚷
|
||
\BGP 𝚿
|
||
\BGR 𝚸
|
||
\BGS 𝚺
|
||
\BGT 𝚻
|
||
\BGTH 𝚯
|
||
\BGU 𝚼
|
||
\BGX 𝚵
|
||
\BGZ 𝚭
|
||
\BGa 𝛂
|
||
\BGb 𝛃
|
||
\BGc 𝛘
|
||
\BGd 𝛅
|
||
\BGe 𝛆
|
||
\BGg 𝛄
|
||
\BGh 𝛈
|
||
\BGi 𝛊
|
||
\BGk 𝛋
|
||
\BGl 𝛌
|
||
\BGm 𝛍
|
||
\BGn 𝛎
|
||
\BGo 𝛚
|
||
\Bomicron 𝛐
|
||
\BGf 𝛗
|
||
\Bpi 𝛑
|
||
\BGp 𝛙
|
||
\BGr 𝛒
|
||
\BGs 𝛔
|
||
\BGt 𝛕
|
||
\BGth 𝛉
|
||
\BGu 𝛖
|
||
\BGx 𝛏
|
||
\BGz 𝛇
|
||
\B0 𝟎
|
||
\B1 𝟏
|
||
\B2 𝟐
|
||
\B3 𝟑
|
||
\B4 𝟒
|
||
\B5 𝟓
|
||
\B6 𝟔
|
||
\B7 𝟕
|
||
\B8 𝟖
|
||
\B9 𝟗
|
||
\FA A
|
||
\FB B
|
||
\FC C
|
||
\FD D
|
||
\FE E
|
||
\FF F
|
||
\FG G
|
||
\FH H
|
||
\FI I
|
||
\FJ J
|
||
\FK K
|
||
\FL L
|
||
\FM M
|
||
\FN N
|
||
\FO O
|
||
\FP P
|
||
\FQ Q
|
||
\FR R
|
||
\FS S
|
||
\FT T
|
||
\FU U
|
||
\FV V
|
||
\FW W
|
||
\FX X
|
||
\FY Y
|
||
\FZ Z
|
||
\Fa a
|
||
\Fb b
|
||
\Fc c
|
||
\Fd d
|
||
\Fe e
|
||
\Ff f
|
||
\Fg g
|
||
\Fh h
|
||
\Fi i
|
||
\Fj j
|
||
\Fk k
|
||
\Fl l
|
||
\Fm m
|
||
\Fn n
|
||
\Fo o
|
||
\Fp p
|
||
\Fq q
|
||
\Fr r
|
||
\Fs s
|
||
\Ft t
|
||
\Fu u
|
||
\Fv v
|
||
\Fw w
|
||
\Fx x
|
||
\Fy y
|
||
\Fz z
|
||
\F0 0
|
||
\F1 1
|
||
\F2 2
|
||
\F3 3
|
||
\F4 4
|
||
\F5 5
|
||
\F6 6
|
||
\F7 7
|
||
\F8 8
|
||
\F9 9
|
||
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\( (
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\asterisk ✣
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\asterisk ✱
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\asterisk ✲
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\apl ⍡
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\apl ⍢
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\apl ⍣
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\apl ⍤
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\apl ⍥
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\apl ⍦
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\apl ⍧
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\apl ⍩
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\apl ⍪
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\apl ⍮
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\apl ⍯
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\apl ⍰
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\apl ⍱
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\apl ⍲
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\apl ⍳
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\apl ⍴
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\apl ⍵
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\apl ⍶
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\apl ⍷
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\apl ⍸
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\apl ⍹
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\apl ⍺
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\# #
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\% %
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\* *
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\/ /
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\@ @
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\" "
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\^-- ̅
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\_-- ̲
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\^~ ̃
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\^^ ̂
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\^^ ̑
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\^v ̆
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\_v ̬
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\_v ̮
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\_v ̺
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\GA Α
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\Gb β
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\GB Β
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\Gg γ
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\Gd δ
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\Ge ε
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\GE Ε
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\Gz ζ
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\Gh η
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\GH Η
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\Gth θ
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\GTH Θ
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\Gi ι
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\GI Ι
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\Gk κ
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\GK Κ
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\Gl λ
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\GL Λ
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\Gl- ƛ
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\Gm μ
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\GM Μ
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\Gn ν
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\Gr ρ
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\GR Ρ
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\Gs σ
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\GS Σ
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\Gt τ
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\GT Τ
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\Gu υ
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\GU Υ
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\Gf φ
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\GF Φ
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\Gc χ
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\GC Χ
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\Gp ψ
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\GP Ψ
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\Go ω
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\GO Ω
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\MiA 𝐴
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\MiB 𝐵
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\MiC 𝐶
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\MiD 𝐷
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\MiE 𝐸
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\MiF 𝐹
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\MiG 𝐺
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\MiH 𝐻
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\MiI 𝐼
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\MiJ 𝐽
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\MiK 𝐾
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\MiL 𝐿
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\MiM 𝑀
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\MiN 𝑁
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\MiO 𝑂
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\MiP 𝑃
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\MiQ 𝑄
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\MiR 𝑅
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\MiS 𝑆
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\MiT 𝑇
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\MiU 𝑈
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\MiV 𝑉
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\MiW 𝑊
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\MiX 𝑋
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\MiY 𝑌
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\MiZ 𝑍
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\Mia 𝑎
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\Mib 𝑏
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\Mic 𝑐
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\Mid 𝑑
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\Mie 𝑒
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\Mif 𝑓
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\Mig 𝑔
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\Mih ℎ
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\Mii 𝑖
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\Mij 𝑗
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\Mik 𝑘
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\Mil 𝑙
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\Mim 𝑚
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\Min 𝑛
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\Mio 𝑜
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\Mip 𝑝
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\Miq 𝑞
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\Mir 𝑟
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\Mis 𝑠
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\Mit 𝑡
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\Miu 𝑢
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\Miv 𝑣
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\Miw 𝑤
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\Mix 𝑥
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\Miy 𝑦
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\Miz 𝑧
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\MIA 𝑨
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\MIB 𝑩
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\MIC 𝑪
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\MID 𝑫
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\MIE 𝑬
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\MIF 𝑭
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\MIG 𝑮
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\MIH 𝑯
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\MII 𝑰
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\MIJ 𝑱
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\MIK 𝑲
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\MIL 𝑳
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\MIM 𝑴
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\MIN 𝑵
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\MIO 𝑶
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\MIP 𝑷
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\MIQ 𝑸
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\MIR 𝑹
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\MIS 𝑺
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\MIT 𝑻
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\MIU 𝑼
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\MIV 𝑽
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\MIW 𝑾
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\MIX 𝑿
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\MIY 𝒀
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\MIZ 𝒁
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\MIa 𝒂
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\MIb 𝒃
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\MIc 𝒄
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\MId 𝒅
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\MIe 𝒆
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\MIg 𝒈
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\MIh 𝒉
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\MIj 𝒋
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\MIk 𝒌
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\MIl 𝒍
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\MIm 𝒎
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\MIn 𝒏
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\MIo 𝒐
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\MIp 𝒑
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\MIq 𝒒
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\MIr 𝒓
|
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\MIs 𝒔
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\MIt 𝒕
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\MIu 𝒖
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\MIv 𝒗
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\MIw 𝒘
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\MIx 𝒙
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\MIy 𝒚
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\MIz 𝒛
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\McA 𝒜
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\McB ℬ
|
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\McC 𝒞
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\McD 𝒟
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\McE ℰ
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\McF ℱ
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\McG 𝒢
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\McH ℋ
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\McI ℐ
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\McJ 𝒥
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\McK 𝒦
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\McL ℒ
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\McM ℳ
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\McN 𝒩
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\McO 𝒪
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\McP 𝒫
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\McQ 𝒬
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\McR ℛ
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\McS 𝒮
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\McT 𝒯
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\McU 𝒰
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\McV 𝒱
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\McW 𝒲
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\McX 𝒳
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\McY 𝒴
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\McZ 𝒵
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\Mca 𝒶
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\Mcb 𝒷
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\Mcc 𝒸
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\Mcd 𝒹
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\Mce ℯ
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\Mcf 𝒻
|
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\Mcg ℊ
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\Mch 𝒽
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\Mci 𝒾
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\Mcj 𝒿
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\Mck 𝓀
|
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\Mcl 𝓁
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\Mcm 𝓂
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\Mcn 𝓃
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\Mco ℴ
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\Mcp 𝓅
|
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\Mcq 𝓆
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\Mcr 𝓇
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\Mcs 𝓈
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\Mct 𝓉
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\Mcu 𝓊
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\Mcv 𝓋
|
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\Mcw 𝓌
|
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\Mcx 𝓍
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\Mcy 𝓎
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\Mcz 𝓏
|
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\MCA 𝓐
|
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\MCB 𝓑
|
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\MCC 𝓒
|
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\MCD 𝓓
|
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\MCE 𝓔
|
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\MCF 𝓕
|
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\MCG 𝓖
|
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\MCH 𝓗
|
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\MCI 𝓘
|
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\MCJ 𝓙
|
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\MCK 𝓚
|
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\MCL 𝓛
|
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\MCM 𝓜
|
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\MCN 𝓝
|
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\MCO 𝓞
|
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\MCP 𝓟
|
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\MCQ 𝓠
|
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\MCR 𝓡
|
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\MCS 𝓢
|
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\MCT 𝓣
|
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\MCU 𝓤
|
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\MCV 𝓥
|
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\MCW 𝓦
|
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\MCX 𝓧
|
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\MCY 𝓨
|
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\MCZ 𝓩
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\MCa 𝓪
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\MCb 𝓫
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\MCc 𝓬
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\MCd 𝓭
|
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\MCe 𝓮
|
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\MCf 𝓯
|
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\MCg 𝓰
|
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\MCh 𝓱
|
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\MCi 𝓲
|
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\MCj 𝓳
|
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\MCk 𝓴
|
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\MCl 𝓵
|
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\MCm 𝓶
|
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\MCn 𝓷
|
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\MCo 𝓸
|
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\MCp 𝓹
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\MCq 𝓺
|
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\MCr 𝓻
|
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\MCs 𝓼
|
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\MCt 𝓽
|
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\MCu 𝓾
|
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\MCv 𝓿
|
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\MCw 𝔀
|
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\MCx 𝔁
|
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\MCy 𝔂
|
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\MCz 𝔃
|
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\MfA 𝔄
|
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\MfB 𝔅
|
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\MfC ℭ
|
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\MfD 𝔇
|
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\MfE 𝔈
|
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\MfF 𝔉
|
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\MfG 𝔊
|
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\MfH ℌ
|
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\MfI ℑ
|
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\MfJ 𝔍
|
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\MfK 𝔎
|
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\MfL 𝔏
|
||
\MfM 𝔐
|
||
\MfN 𝔑
|
||
\MfO 𝔒
|
||
\MfP 𝔓
|
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\MfQ 𝔔
|
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\MfR ℜ
|
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\MfS 𝔖
|
||
\MfT 𝔗
|
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\MfU 𝔘
|
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\MfV 𝔙
|
||
\MfW 𝔚
|
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\MfX 𝔛
|
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\MfY 𝔜
|
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\MfZ ℨ
|
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\Mfa 𝔞
|
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\Mfb 𝔟
|
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\Mfc 𝔠
|
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\Mfd 𝔡
|
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\Mfe 𝔢
|
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\Mff 𝔣
|
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\Mfg 𝔤
|
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\Mfh 𝔥
|
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\Mfi 𝔦
|
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\Mfj 𝔧
|
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\Mfk 𝔨
|
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\Mfl 𝔩
|
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\Mfm 𝔪
|
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\Mfn 𝔫
|
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\Mfo 𝔬
|
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\Mfp 𝔭
|
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\Mfq 𝔮
|
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\Mfr 𝔯
|
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\Mfs 𝔰
|
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\Mft 𝔱
|
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\Mfu 𝔲
|
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\Mfv 𝔳
|
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\Mfw 𝔴
|
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\Mfx 𝔵
|
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\Mfy 𝔶
|
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\Mfz 𝔷
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\_a ₐ
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\_e ₑ
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\_i ᵢ
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\_j ⱼ
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\_l ₗ
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\_m ₘ
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\_p ₚ
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\_r ᵣ
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\_s ₛ
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\_t ₜ
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\_u ᵤ
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\_v ᵥ
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\_x ₓ
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\_Gb ᵦ
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\_Gg ᵧ
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\^i ⁱ
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\^j ʲ
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\^Gb ᵝ
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\^Gg ᵞ
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\^Gd ᵟ
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\^Ge ᵋ
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\^Gth ᶿ
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\^Gi ᶥ
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\^Gf ᵠ
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\^Gc ᵡ
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\^GF ᶲ
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\^0 ⁰
|
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\^1 ⁱ
|
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\^2 ²
|
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\^3 ³
|
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\^4 ⁴
|
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\^5 ⁵
|
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\^6 ⁶
|
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\^7 ⁷
|
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\^8 ⁸
|
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\^9 ⁹
|
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\^+ ⁺
|
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\^- ⁻
|
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\^= ⁼
|
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\^( ⁽
|
||
\^) ⁾
|
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\_+ ₊
|
||
\_- ₋
|
||
\_= ₌
|
||
\_( ₍
|
||
\_) ₎
|
||
\
|
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\! ¡
|
||
\cent ¢
|
||
\brokenbar ¦
|
||
\degree °
|
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\? ¿
|
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\^a_ ª
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\^o_ º
|
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\(0) ⓪
|
||
\(0) 🄀
|
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\(0) ⓿
|
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\(0) 🄋
|
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\(0) 🄌
|
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\(1) ⑴
|
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\(1) ①
|
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\(1) ⒈
|
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\(1) ❶
|
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\(1) ➀
|
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\(1) ➊
|
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\(2) ⑵
|
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\(2) ②
|
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\(2) ⒉
|
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\(2) ❷
|
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\(2) ➁
|
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\(2) ➋
|
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\(3) ⑶
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\(3) ③
|
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|
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\(3) ❸
|
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\(3) ➂
|
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\(3) ➌
|
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\(4) ⑷
|
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\(4) ④
|
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\(4) ⒋
|
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\(4) ❹
|
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\(4) ➃
|
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\(4) ➍
|
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\(5) ⑸
|
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\(5) ⑤
|
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\(5) ⒌
|
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\(5) ❺
|
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\(5) ➄
|
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\(5) ➎
|
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\(6) ⑹
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\(6) ⑥
|
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\(6) ⒍
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\(6) ❻
|
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\(6) ➅
|
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\(6) ➏
|
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\(7) ⑺
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\(7) ⑦
|
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\(7) ⒎
|
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\(7) ❼
|
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\(7) ➆
|
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\(7) ➐
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\(8) ⑻
|
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\(8) ⑧
|
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\(8) ⒏
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\(8) ❽
|
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\(8) ➇
|
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\(8) ➑
|
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\(9) ⑼
|
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\(9) ⑨
|
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\(9) ⒐
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\(9) ❾
|
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\(9) ➈
|
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\(9) ➒
|
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\(10) ⑽
|
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\(10) ⑩
|
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\(10) ⒑
|
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\(10) ❿
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\(10) ➉
|
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\(10) ➓
|
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\(11) ⑾
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\(11) ⑪
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\(11) ⒒
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\(11) ⓫
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\(12) ⑿
|
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\(12) ⑫
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\(12) ⒓
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\(12) ⓬
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\(13) ⒀
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\(13) ⑬
|
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\(13) ⒔
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\(13) ⓭
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\(14) ⒁
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\(14) ⑭
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\(14) ⒕
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\(14) ⓮
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\(15) ⒂
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\(15) ⑮
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\(15) ⒖
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\(15) ⓯
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\(16) ⒃
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\(16) ⑯
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\(16) ⒗
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\(16) ⓰
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\(17) ⒄
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\(17) ⑰
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\(17) ⒘
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\(17) ⓱
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\(18) ⒅
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\(18) ⑱
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\(18) ⒙
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\(18) ⓲
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\(19) ⒆
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\(19) ⑲
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\(19) ⒚
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\(19) ⓳
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\(20) ⒇
|
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\(20) ⑳
|
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\(20) ⒛
|
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\(20) ⓴
|
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\(a) ⒜
|
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\(a) Ⓐ
|
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\(a) ⓐ
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\(a) 🅐
|
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\(a) 🄰
|
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\(a) 🅰
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\(b) ⒝
|
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\(b) Ⓑ
|
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\(b) ⓑ
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\(b) 🅑
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\(b) 🄱
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\(b) 🅱
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\(c) ⒞
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\(c) Ⓒ
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\(c) ⓒ
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\(c) 🅒
|
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\(c) 🄲
|
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\(c) 🅲
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\(d) ⒟
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\(d) Ⓓ
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\(d) ⓓ
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\(d) 🅓
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\(d) 🄳
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|
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\(f) 🄵
|
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\(g) ⒢
|
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|
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|
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\(i) ⒤
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\(i) ⓘ
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|
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\(i) 🄸
|
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|
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\(j) ⒥
|
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|
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\(j) ⓙ
|
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|
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\(j) 🄹
|
||
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|
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\(k) ⒦
|
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|
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\(k) ⓚ
|
||
\(k) 🅚
|
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\(k) 🄺
|
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\(k) 🅺
|
||
\(l) ⒧
|
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\(l) Ⓛ
|
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\(l) ⓛ
|
||
\(l) 🅛
|
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\(l) 🄻
|
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\(l) 🅻
|
||
\(m) ⒨
|
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|
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\(m) ⓜ
|
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\(m) 🅜
|
||
\(m) 🄼
|
||
\(m) 🅼
|
||
\(n) ⒩
|
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\(n) Ⓝ
|
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\(n) ⓝ
|
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\(n) 🅝
|
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\(n) 🄽
|
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\(n) 🅽
|
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\(o) ⒪
|
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|
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\(o) ⓞ
|
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\(o) 🅞
|
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\(o) 🄾
|
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|
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\(p) ⒫
|
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|
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\(p) ⓟ
|
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\(p) 🅟
|
||
\(p) 🄿
|
||
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|
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\(q) ⒬
|
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\(q) Ⓠ
|
||
\(q) ⓠ
|
||
\(q) 🅠
|
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\(q) 🅀
|
||
\(q) 🆀
|
||
\(r) ⒭
|
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\(r) Ⓡ
|
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\(r) ⓡ
|
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\(r) 🅡
|
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\(r) 🅁
|
||
\(r) 🆁
|
||
\(s) ⒮
|
||
\(s) Ⓢ
|
||
\(s) ⓢ
|
||
\(s) 🅢
|
||
\(s) 🅂
|
||
\(s) 🆂
|
||
\(t) ⒯
|
||
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|
||
\(t) ⓣ
|
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\(t) 🅣
|
||
\(t) 🅃
|
||
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|
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\(u) ⒰
|
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|
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\(u) ⓤ
|
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|
||
\(u) 🅄
|
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|
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\(v) ⒱
|
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|
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|
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|
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\(v) 🅅
|
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|
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\(w) ⒲
|
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|
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|
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|
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|
||
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|
||
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|
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|
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|
||
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|
||
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|
||
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|
||
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|
||
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|
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|
||
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|
||
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|
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|
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\(z) ⒵
|
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|
||
\(z) ⓩ
|
||
\(z) 🅩
|
||
\(z) 🅉
|
||
\(z) 🆉
|
||
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|
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\hat ^
|
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\_ _
|
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\grave `
|
||
\tilde ~
|
||
\pounds £
|
||
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|
||
\ddot ¨
|
||
\lnot ¬
|
||
\bar ¯
|
||
\circ ∘
|
||
\circ °
|
||
\pm ±
|
||
\acute ´
|
||
\mu µ
|
||
\P ¶
|
||
\cdot ·
|
||
\frac14 ¼
|
||
\frac12 ½
|
||
\frac34 ¾
|
||
\times ×
|
||
\div ÷
|
||
\Gamma Γ
|
||
\Delta Δ
|
||
\Theta Θ
|
||
\Lambda Λ
|
||
\Xi Ξ
|
||
\Pi Π
|
||
\Sigma Σ
|
||
\Phi Φ
|
||
\Psi Ψ
|
||
\Omega Ω
|
||
\alpha α
|
||
\beta β
|
||
\gamma γ
|
||
\delta δ
|
||
\varepsilon ε
|
||
\zeta ζ
|
||
\eta η
|
||
\theta θ
|
||
\iota ι
|
||
\kappa κ
|
||
\lambda λ
|
||
\mu μ
|
||
\nu ν
|
||
\xi ξ
|
||
\pi π
|
||
\rho ρ
|
||
\varsigma ς
|
||
\sigma σ
|
||
\tau τ
|
||
\upsilon υ
|
||
\phi φ
|
||
\chi χ
|
||
\psi ψ
|
||
\omega ω
|
||
\vartheta ϑ
|
||
\varphi ϕ
|
||
\varpi ϖ
|
||
\varsigma ϛ
|
||
\varrho ϱ
|
||
\epsilon ϵ
|
||
\dag †
|
||
\ddag ‡
|
||
\bullet •
|
||
\dots …
|
||
\mathbb{C} ℂ
|
||
\mathcal{E} ℇ
|
||
\mathfrak{H} ℌ
|
||
\mathbb ℍ
|
||
\hbar ℏ
|
||
\Im ℑ
|
||
\ell ℓ
|
||
\mathbb ℕ
|
||
\wp ℘
|
||
\mathbb ℙ
|
||
\mathbb ℚ
|
||
\Re ℜ
|
||
\mathbb ℝ
|
||
\mathbb ℤ
|
||
\Omega Ω
|
||
\mho ℧
|
||
\mathfrak ℨ
|
||
\mathfrak ℭ
|
||
\Finv Ⅎ
|
||
\aleph ℵ
|
||
\beth ℶ
|
||
\gimel ℷ
|
||
\daleth ℸ
|
||
\frac13 ⅓
|
||
\frac23 ⅔
|
||
\frac15 ⅕
|
||
\frac25 ⅖
|
||
\frac35 ⅗
|
||
\frac45 ⅘
|
||
\frac16 ⅙
|
||
\frac56 ⅚
|
||
\frac18 ⅛
|
||
\frac38 ⅜
|
||
\frac58 ⅝
|
||
\frac78 ⅞
|
||
\frac1 ⅟
|
||
\leftarrow ←
|
||
\uparrow ↑
|
||
\rightarrow →
|
||
\downarrow ↓
|
||
\leftrightarrow ↔
|
||
\updownarrow ↕
|
||
\nwarrow ↖
|
||
\nearrow ↗
|
||
\searrow ↘
|
||
\searrow ↙
|
||
\nleftarrow ↚
|
||
\nrightarrow ↛
|
||
\leadsto ↝
|
||
\twoheadleftarrow ↞
|
||
\twoheadrightarrow ↠
|
||
\leftarrowtail ↢
|
||
\rightarrowtail ↣
|
||
\mapsto ↦
|
||
\hookleftarrow ↩
|
||
\hookrightarrow ↪
|
||
\looparrowleft ↫
|
||
\looparrowright ↬
|
||
\leftrightsquigarrow ↭
|
||
\nleftrightarrow ↮
|
||
\Lsh ↰
|
||
\Rsh ↱
|
||
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|
||
\curvearrowright ↷
|
||
\circlearrowleft ↺
|
||
\circlearrowright ↻
|
||
\leftharpoonup ↼
|
||
\leftharpoondown ↽
|
||
\upharpoonright ↾
|
||
\upharpoonleft ↿
|
||
\rightharpoonup ⇀
|
||
\rightharpoondown ⇁
|
||
\downharpoonright ⇂
|
||
\downharpoonleft ⇃
|
||
\rightleftarrows ⇄
|
||
\leftrightarrows ⇆
|
||
\leftleftarrows ⇇
|
||
\upuparrows ⇈
|
||
\rightrightarrows ⇉
|
||
\downdownarrows ⇊
|
||
\leftrightharpoons ⇋
|
||
\rightleftharpoons ⇌
|
||
\nLeftarrow ⇍
|
||
\nLeftrightarrow ⇎
|
||
\nRightarrow ⇏
|
||
\Leftarrow ⇐
|
||
\Uparrow ⇑
|
||
\Rightarrow ⇒
|
||
\Downarrow ⇓
|
||
\Leftrightarrow ⇔
|
||
\Updownarrow ⇕
|
||
\Lleftarrow ⇚
|
||
\rightsquigarrow ⇝
|
||
\dashleftarrow ⇠
|
||
\dashrightarrow ⇢
|
||
\forall ∀
|
||
\complement ∁
|
||
\partial ∂
|
||
\exists ∃
|
||
\nexists ∄
|
||
\emptyset ∅
|
||
\Delta ∆
|
||
\nabla ∇
|
||
\in ∈
|
||
\notin ∉
|
||
\in ∊
|
||
\ni ∋
|
||
\not\ni ∌
|
||
\ni ∍
|
||
\blacksquare ∎
|
||
\prod ∏
|
||
\amalg ∐
|
||
\sum ∑
|
||
\mp ∓
|
||
\dotplus ∔
|
||
\setminus ∖
|
||
\ast ∗
|
||
\bullet ∙
|
||
\surd √
|
||
\sqrt √
|
||
\sqrt[3] ∛
|
||
\sqrt[4] ∜
|
||
\propto ∝
|
||
\infty ∞
|
||
\angle ∠
|
||
\measuredangle ∡
|
||
\sphericalangle ∢
|
||
\mid ∣
|
||
\nmid ∤
|
||
\parallel ∥
|
||
\nparallel ∦
|
||
\wedge ∧
|
||
\vee ∨
|
||
\cap ∩
|
||
\cup ∪
|
||
\int ∫
|
||
\iint ∬
|
||
\iiint ∭
|
||
\oint ∮
|
||
\oiint ∯
|
||
\oiiint ∰
|
||
\therefore ∴
|
||
\because ∵
|
||
\stackrel ∸
|
||
\sim ∼
|
||
\backsim ∽
|
||
\wr ≀
|
||
\nsim ≁
|
||
\simeq ≃
|
||
\not\simeq ≄
|
||
\cong ≅
|
||
\ncong ≇
|
||
\approx ≈
|
||
\not\approx ≉
|
||
\approxeq ≊
|
||
\asymp ≍
|
||
\Bumpeq ≎
|
||
\bumpeq ≏
|
||
\doteq ≐
|
||
\doteqdot ≑
|
||
\fallingdotseq ≒
|
||
\risingdotseq ≓
|
||
\eqcirc ≖
|
||
\circeq ≗
|
||
\stackrel ≘
|
||
\stackrel ≙
|
||
\stackrel ≚
|
||
\stackrel ≛
|
||
\triangleq ≜
|
||
\defeq ≝
|
||
\stackrel ≞
|
||
\stackrel ≟
|
||
\neq ≠
|
||
\equiv ≡
|
||
\not\equiv ≢
|
||
\leq ≤
|
||
\geq ≥
|
||
\leqq ≦
|
||
\geqq ≧
|
||
\lneqq ≨
|
||
\gneqq ≩
|
||
\ll ≪
|
||
\gg ≫
|
||
\between ≬
|
||
\not\asymp ≭
|
||
\nless ≮
|
||
\ngtr ≯
|
||
\nleq ≰
|
||
\ngeq ≱
|
||
\lesssim ≲
|
||
\gtrsim ≳
|
||
\not\lesssim ≴
|
||
\not\gtrsim ≵
|
||
\lessgtr ≶
|
||
\gtrless ≷
|
||
\not\lessgtr ≸
|
||
\not\gtrless ≹
|
||
\prec ≺
|
||
\succ ≻
|
||
\preccurlyeq ≼
|
||
\succcurlyeq ≽
|
||
\precsim ≾
|
||
\succsim ≿
|
||
\nsucc ⊀
|
||
\nprec ⊁
|
||
\subset ⊂
|
||
\supset ⊃
|
||
\not\subset ⊄
|
||
\not\supset ⊅
|
||
\subseteq ⊆
|
||
\supseteq ⊇
|
||
\nsubseteq ⊈
|
||
\nsupseteq ⊉
|
||
\subsetneq ⊊
|
||
\supsetneq ⊋
|
||
\uplus ⊎
|
||
\sqsubset ⊏
|
||
\sqsupset ⊐
|
||
\sqsubseteq ⊑
|
||
\sqsupseteq ⊒
|
||
\sqcap ⊓
|
||
\sqcup ⊔
|
||
\oplus ⊕
|
||
\ominus ⊖
|
||
\otimes ⊗
|
||
\oslash ⊘
|
||
\odot ⊙
|
||
\circledcirc ⊚
|
||
\circledast ⊛
|
||
\circleddash ⊝
|
||
\boxplus ⊞
|
||
\boxminus ⊟
|
||
\boxtimes ⊠
|
||
\boxdot ⊡
|
||
\vdash ⊢
|
||
\dashv ⊣
|
||
\bot ⊤
|
||
\perp ⊥
|
||
\vDash ⊧
|
||
\models ⊨
|
||
\Vdash ⊩
|
||
\Vvdash ⊪
|
||
\nvdash ⊬
|
||
\nvDash ⊭
|
||
\not\Vdash ⊮
|
||
\nVdash ⊯
|
||
\lhd ⊲
|
||
\rhd ⊳
|
||
\unlhd ⊴
|
||
\unrhd ⊵
|
||
\multimapdotbothA ⊶
|
||
\multimapdotbothB ⊷
|
||
\multimap ⊸
|
||
\intercal ⊺
|
||
\veebar ⊻
|
||
\barwedge ⊼
|
||
\bigwedge ⋀
|
||
\bigvee ⋁
|
||
\bigcap ⋂
|
||
\bigcup ⋃
|
||
\diamond ⋄
|
||
\cdot ⋅
|
||
\star ⋆
|
||
\divideontimes ⋇
|
||
\bowtie ⋈
|
||
\ltimes ⋉
|
||
\rtimes ⋊
|
||
\leftthreetimes ⋋
|
||
\rightthreetimes ⋌
|
||
\backsimeq ⋍
|
||
\curlyvee ⋎
|
||
\curlywedge ⋏
|
||
\Subset ⋐
|
||
\Supset ⋑
|
||
\Cap ⋒
|
||
\Cup ⋓
|
||
\pitchfork ⋔
|
||
\lessdot ⋖
|
||
\gtrdot ⋗
|
||
\lll ⋘
|
||
\ggg ⋙
|
||
\lesseqgtr ⋚
|
||
\gtreqless ⋛
|
||
\eqslantless ⋜
|
||
\eqslantgtr ⋝
|
||
\curlyeqprec ⋞
|
||
\curlyeqsucc ⋟
|
||
\not\curlyeqprec ⋠
|
||
\not\curlyeqsucc ⋡
|
||
\not\sqsubseteq ⋢
|
||
\not\sqsupseteq ⋣
|
||
\lnsim ⋦
|
||
\gnsim ⋧
|
||
\precnsim ⋨
|
||
\succnsim ⋩
|
||
\ntriangleleft ⋪
|
||
\ntriangleright ⋫
|
||
\ntrianglelefteq ⋬
|
||
\ntrianglerighteq ⋭
|
||
\vdots ⋮
|
||
\cdots ⋯
|
||
\ddotsup ⋰
|
||
\ddots ⋱
|
||
\spadesuit ♠
|
||
\heartsuit ♡
|
||
\diamondsuit ♢
|
||
\clubsuit ♣
|
||
\spadesuit ♤
|
||
\heartsuit ♥
|
||
\diamondsuit ♦
|
||
\clubsuit ♧
|
||
\flat ♭
|
||
\natural ♮
|
||
\sharp ♯
|